A characterization of the alpha-connections on the statistical manifold of multivariate normal distributions
Abstract
We study a statistical manifold (N, gF, ∇A, ∇A*) of multivariate normal distributions, where gF is the Fisher metric and ∇A is the Amari-Chentsov connection and ∇A* is its conjugate connection. We will show that it admits a solvable Lie group structure and moreover the Amari-Chentsov connection ∇A on (N, gF) will be characterized by the conjugate symmetry, i.e., a curvatures identity R=R* of a connection ∇ and its conjugate connection ∇*.
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